Please do g and h

Transcribed Image Text:

Activity 10.6.5. Consider the function f defined by f(x, y) = -x + 2xy — Y. a. Find the gradient ▼ƒ(1, 2) and sketch it on Figure 10.6.5. 3 2+ 1 Y 2 3 Figure 10.6.5. A plot for the gradient V ƒ(1, 2). X 4 1 b. Sketch the unit vector z = (-1/2) -√2) on Figure 10.6.5 with its tail at √2 (1,2). Now find the directional derivative D₂ƒ(1,2). c. What is the slope of the graph of f in the direction z? What does the sign of the directional derivative tell you? d. Consider the vector v = (2, -1) and sketch v on Figure 10.6.5 with its tail at (1, 2). Find a unit vector w pointing in the same direction of v. Without computing Dwƒ(1, 2), what do you know about the sign of this directional derivative? Now verify your observation by computing Dwf(1,2). e. In which direction (that is, for what unit vector u) is D„ƒ(1, 2) the greatest? What is the slope of the graph in this direction? f. Corresponding, in which direction is Däƒ(1, 2) least? What is the slope of the graph in this direction?

Transcribed Image Text:

Figure 10.6.5. A plot for the gradient Vƒ(1, 2). b. Sketch the unit vector z = ( - 1/2 - 1/12) on Figure 10.6.5 with its tail at √2' √2 (1, 2). Now find the directional derivative D₂ƒ(1,2). c. What is the slope of the graph of f in the direction z? What does the sign of the directional derivative tell you? d. Consider the vector v = (2, -1) and sketch v on Figure 10.6.5 with its tail at (1, 2). Find a unit vector w pointing in the same direction of v. Without computing Dwƒ(1, 2), what do you know about the sign of this directional derivative? Now verify your observation by computing Dwf(1,2). e. In which direction (that is, for what unit vector u) is D.ƒ(1, 2) the greatest? What is the slope of the graph in this direction? f. Corresponding, in which direction is Däƒ(1, 2) least? What is the slope of the graph in this direction? g. Sketch two unit vectors u for which Duf(1, 2) = 0 and then find component representations of these vectors. h. Suppose you are standing at the point (3, 3). In which direction should you move to cause f to increase as rapidly as possible? At what rate does f increase in this direction?